Fractional Pantograph Delay Equations Solving by the Meshless Methods

Shefaa M. N. Jasim, Ghada H. Ibraheem
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Abstract

This work describes two efficient and useful methods for solving fractional pantograph delay equations (FPDEs) with initial and boundary conditions. These two methods depend mainly on orthogonal polynomials, which are the method of the operational matrix of fractional derivative that depends on Bernstein polynomials and the operational matrix of the fractional derivative with Shifted Legendre polynomials. The basic procedure of this method is to convert the pantograph delay equation to a system of linear equations and by using, the operational matrices we get rid of the integration and differentiation operations, which makes solving the problem easier. The concept of Caputo has been used to describe fractional derivatives. Finally, some numerical examples are identified to show the utility and capability of the two proposed approaches. Mathematica®12 program has been relied upon in the calculations.
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无网格法求解分数阶受电弓延迟方程
本文描述了求解具有初始和边界条件的分数阶受电弓延迟方程(FPDEs)的两种有效方法。这两种方法主要依赖于正交多项式,分别是依赖于Bernstein多项式的分数阶导数运算矩阵法和带移位勒让德多项式的分数阶导数运算矩阵法。该方法的基本步骤是将受电弓延迟方程转化为线性方程组,并利用运算矩阵来消除积分和微分运算,使问题的求解更加容易。卡普托的概念已被用来描述分数阶导数。最后,通过数值算例验证了两种方法的有效性和有效性。在计算中依赖于Mathematica®12程序。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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发文量
67
审稿时长
18 weeks
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